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int_0^2x/(sqrt(1+x^2))dx

3 Answers
Cem Sentin
Nov 26, 2017

int_0^2 x/sqrt(1+x^2)*dx=sqrt5-1

Explanation:

int_0^2 x/sqrt(1+x^2)*dx

=int_0^2 (2x*dx)/(2sqrt(1+x^2))

After using u=x^2 and du=2x*dx transforms, this integral became

int_0^4 (du)/(2sqrt(1+u))

=1/2*int_0^4 (1+u)^(-1/2)*du

=1/2*[(1+u)^(-1/2+1)/(-1/2+1)]_0^4

=1/2*[(1+u)^(1/2)/(1/2)]_0^4

=[(1+u)^(1/2)]_0^4

=5^(1/2)-1^(1/2)

=sqrt5-1

Douglas K.
Nov 26, 2017

int_0^2x/(sqrt(1+x^2))dx = sqrt5-1

Explanation:

let u = x^2+1, then du=2xdx or xdx = 1/2du

Change the limits:

a = 0^2+1

a = 1

b = 2^2+1

b = 5

int_0^2x/(sqrt(1+x^2))dx = 1/2int_1^5u^(-1/2)du

int_0^2x/(sqrt(1+x^2))dx = (u^(1/2)]_1^5

int_0^2x/(sqrt(1+x^2))dx = sqrt5-1

Anthony R.
Nov 26, 2017

int_0^2 x/sqrt(1+x^2)dx=sqrt5-1

Explanation:

We can make a substitution to solve this integral:

Let u=1+x^2

int_0^2 x/sqrt(u)dx

And so du=2xdx which we can then solve for x to get 1/2du=xdx

Replacing xdx with 1/2du we now have

int_0^2 1/(2sqrt(u))du

Take out the constant...

1/2int_0^2 1/(sqrt(u))du

Applying the power rule for integration:

1/2int_0^2 (u)^(-1/2)du

1/2* ((u)^((-1/2)+1))/((-1/2)+1)

1/2* (u)^(1/2)/(1/2)

1/2* 2sqrtu

Simplify and substitute back u=1+x^2

[sqrt(1+x^2)+"C"]_0^2

Now evaluating the integral from 0 to 2

[sqrt(1+color(red)2^2)+"C"] - [sqrt(1+color(red)0^2)+"C"]

[sqrt(5)] - [1]

So

int_0^2 x/sqrt(1+x^2)dx=sqrt5-1

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